Multi-CCC current source models and static timing analysis methods for integrated circuit designs

ABSTRACT

In one embodiment of the invention, a multi-CCC current source model is disclosed to perform statistical timing analysis of an integrated circuit design. The multi-CCC current source model includes a voltage waveform transfer function, a voltage dependent current source, and an output capacitor. The voltage waveform transfer function receives an input voltage waveform and transforms it into an intermediate voltage waveform. The voltage dependent current source generates an output current in response to the intermediate voltage waveform. The output capacitor is coupled in parallel to the voltage dependent current source to generate an output voltage waveform for computation of a timing delay.

CROSS-REFERENCE TO RELATED APPLICATIONS

The present application is a divisional of and claims the benefit of U.S. patent application Ser. No. 11/849,254, entitled SENSITIVITY AND STATIC TIMING ANALYSIS FOR INTEGRATED CIRCUIT DESIGNS USING A MULTI-CCC CURRENT SOURCE MODEL, filed on Aug. 31, 2008 by Vinod Kariat et al., pending.

FIELD

The embodiments of the invention relate generally to integrated circuit design software tools, such as static timing analysis software tools and signal integrity analysis software tools for designing integrated circuits.

BACKGROUND

Electronic computer aided design (ECAD) software tools for static timing analysis (STA) may be used to estimate timing delays in an electronic circuit such as that found in an integrated circuit. However as process technology improves so that smaller transistor channels of 65 nano-meters (nm) and 45 nm become available, there is an increased need for even more accurate timing analysis. Additionally with the smaller geometries there may be a number of unknown effects to electronic signal propagation that may be considered, which may not have been as severe with more relaxed process technology nodes.

BRIEF SUMMARY

The embodiments of the invention are summarized by the claims that follow below.

BRIEF DESCRIPTIONS OF THE DRAWINGS

FIG. 1A is a block diagram of an integrated circuit design flow including a statistical static timing analyzer in accordance with an embodiment of the invention.

FIG. 1B is a block diagram of a multi-CCC gate delay calculator in accordance with one embodiment of the invention.

FIG. 1C is a block diagram of a portion of an exemplary netlist with stages of standard cells along delay paths between flip flops.

FIG. 1D illustrates an exemplary pair of stages of standard cells coupled together.

FIG. 2A is a schematic diagram of an exemplary stage of a standard cell in a netlist.

FIG. 2B are waveform diagrams to illustrated signals of the schematic diagram of FIG. 2A.

FIGS. 3A-3C are schematic diagrams of exemplary single-CCC standard cells and multi-CCC standard cells.

FIG. 4A illustrates an abstracted view of a multistage standard cell, such as an XOR gate.

FIG. 4B illustrates a multi-CCC current source model in accordance with one embodiment of the invention.

FIG. 4C illustrates an abstracted view of another multistage standard cell, such as an AND gate, configured for characterizing the miller capacitance (C_(miller) or C_(m)) of the multi-CCC current source model.

FIG. 5A illustrates an input voltage waveform and an intermediate voltage waveform generated by the application of voltage transform function in accordance with one embodiment of the invention.

FIG. 5B illustrates an input voltage waveform and an output current waveform generated by the application of a second transform function in accordance with another embodiment of the invention.

FIG. 5C illustrates an input voltage waveform with a new slew rate and characterization of the second transform function in accordance with another embodiment of the invention.

FIG. 5D illustrates equi-current normalized time curves to perform time transformation and generate an output current in response to an input voltage waveform with a new slew rate in accordance with another embodiment of the invention.

FIG. 6A illustrate output reference current waveforms generated by applying an input ramp voltage with a reference slew rate with different settings of fixed output voltage.

FIG. 6B illustrates normalized current curves from which parameters to characterize the voltage transform may be extracted.

FIG. 7 shows voltage waveform results from a static timing analyzer using the multi-CCC current source model and a spice transistor level circuit simulator for comparison.

FIG. 8 shows the timing delays obtained from the static analyzer using the multi-CCC current source model in comparison with the spice transistor level circuit simulator.

FIG. 9 illustrates a normalized input voltage waveform and a partially transformed voltage waveform.

FIG. 10 illustrates the final transformations of the partially transformed voltage waveform into the intermediate voltage waveform.

FIG. 11 illustrates a table storing values for T_(σ) and τ_(σ) which is indexed by slew rate σ.

FIG. 12 illustrates a table storing values for F_(σ)(V) which is indexed by slew rate σ and the normalized time value V.

FIG. 13 illustrates a table storing I_(o)(V_(c), V_(o)) which is indexed by both V_(c) and V_(o).

FIG. 14 illustrates a table storing values of C_(g) which may be looked up given V_(o).

FIG. 15 illustrates a table of equi-currents at normalized time values for time transformation of an input waveform.

FIG. 16 is a flowchart illustrating the characterization of model parameters for the multi-CCC current source model.

FIG. 17 is a flow chart to illustrate the characterization of the output current of the multi-CCC standard cell.

FIG. 18 is a flow chart to illustrate characterization of the voltage transform function of the multi-CCC standard cell.

FIG. 19 illustrates a flow chart of the characterization of the standard cell parasitics.

FIG. 20 illustrates a flow chart of the characterization of the miller capacitance.

FIG. 21 is a flow chart for performing a timing analysis of the circuit netlist of FIG. 1D.

FIGS. 22A-22C illustrate plots of exemplary waveforms for the input voltage ramp Vi, intermediate voltage Vc, and the output current I_(out) for characterization of the miller capacitance in one embodiment of the invention.

FIGS. 23A-23C illustrate plots of exemplary waveforms for the input voltage ramp Vi, intermediate voltage Vc, and the output current I_(out) for characterization of the miller capacitance in another embodiment of the invention.

FIG. 24 illustrates a block diagram of a circuit stage for a vector analysis of the timing delay and the sensitivity of the timing delay to process variations.

DETAILED DESCRIPTION

In the following detailed description of the embodiments of the invention, numerous specific details are set forth in order to provide a thorough understanding. However, it will be obvious to one skilled in the art that the embodiments of the invention may be practiced without these specific details. In other instances well known methods, procedures, components, and circuits have not been described in detail so as not to unnecessarily obscure aspects of the embodiments of the invention.

Introduction

FIG. 1A illustrates an exemplary integrated circuit design flow 100 employing embodiments of the invention. Digital performance analysis software tools, such as Static Timing Analysis (STA) software tools and Signal Integrity (SI) Analysis software tools 101, are used to estimate the performance of an integrated circuit chip. As shown in FIG. 1A, these software tools may internally employ different levels of abstraction, a graph level abstraction, a net level abstraction, and a shape level abstraction.

At the graph level of abstraction, the highest level, the software tool works with the entire circuit design as a design graph. The graph level abstraction propagates quantities or metrics of interest from the inputs of the circuit design to the outputs of the circuit design. For example, an STA tool may propagate arrival times throughout the circuit design.

At the net level of abstraction, the STA software tool calculates quantities of interest for each of the nets in the design. While doing an SI analysis, an SI analysis software tool may calculate the crosstalk glitch induced on a specific net.

At the shape level of abstraction, the software tools work with information from the actual chip layout. The information may include device sizes and interconnect parasitics, for example, such as can be obtained from a parasitic extractor.

In some embodiments of the invention, an electrical calculation engine component or delay calculator 102 is provided for the net level abstraction layer of electrical analysis software tools.

Referring now to FIG. 1B, a block diagram of a multi-CCC gate delay calculator (EOS) 102 is illustrated. The multi-CCC gate delay calculator (EOS) 102 may also be referred to herein as an electrical calculator. The delay calculator 102 receives characterization data 104 and a netlist 106 to generate timing delays 108 (e.g., max timing delay, min timing delay) including process sensitivities. The characterization data 104 may be part of a cell library of logic cells.

The delay calculator 102 includes an application programming interface (API) 110, an interconnect reducer & analysis engine 112, a gate simulation engine 114, and a multi-CCC current source model 116 coupled together as shown.

The interconnect reducer & analysis engine 112 receives the netlist 106 including a defined interconnect of standard cells to reduce it down to a simplified model for use with the gate simulation engine 114. The interconnect reduction and analysis engine 112 reduces the extracted parasitic network down to a simplified load model. Typically, the extracted parasitic network corresponding to an output net can be very large. Since only the inputs and outputs of the net need to be monitored, the interconnect network may be reduced to create a smaller, electrically equivalent representation speeding up delay calculations while preserving the input-to-output electrical behavior of the net.

The multi-CCC current source model 116, described in further detail below, receives the characterization data 104 and models single-CCC and multi-CCC standard cells in response to the type of standard cell in the netlist that is being analyzed in a given stage of a delay path. The multi-CCC current source model 116 describes the electrical behavior of a standard cell in an abstract fashion in order to speed electrical calculations, such as delay calculations and noise delay calculations, and sensitivity calculations. The parameters of the gate model are usually derived by a library characterization process, such as described below.

The gate simulation engine 114 calculates the output waveform at the output of a given gate in response to the input stimulus as well as the multi-CCC current source model 116 and its parameters. A simplified load model may be used to model the effect of the interconnect loading on the gate. A noise model may also be used to model noise from aggressors in the standard cell.

The parameters for each standard cell to fashion its corresponding gate model are typically stored in a standard cell library. The IC netlist design data is stored in some form in the host tool. One or more application programming interfaces (API) 110 interact with the library and the design data to read information there-from. Another one or more APIs 110 may be used by graph level engines, operating at the graph level on the netlist to determine delays along data paths for example, to call the delay calculator 110 and obtain the timing results of the calculations at each gate along a graphed path.

A current source model for a multi-CCC structure described below may be used for both delay and SI calculations. Thus, a single characterization process may yield a gate model for both delay and SI calculations.

FIG. 1C illustrates a block diagram of a portion of an exemplary netlist including a plurality of delay paths DP1-DPi from D flip-flops/latches/registers 121A-121B multiplexed into a D flip-flop/latch/register 121C by a multiplexer 122. The delay calculator 102 may be used to compute the timing delays through the delay paths between the D flip-flops/latches/registers 121A-121B and the D flip-flop/latch/register 121C.

The delay paths DP1-DPi may have various stages of single-CCC and multi-CCC standard cells. A first delay path DP1 includes a single stage Stage1. A second delay path DP2 includes two stages, Stage1 and Stage2. A third delay path DP3 includes M stages, Stage1 through StageM. An i^(th) delay path Dpi includes N stages, Stage1 through StageN.

FIG. 1D illustrates an exemplary pair of stages of standard cells, Stage(i) and Stage(i+1). The stage(i) may be modeled by a driver 130 driving a coupled RC interconnect network 132 and an load impedance Zr 136. One or more neighbor nets 133-135 may induce noise through the coupled RC interconnect network 132. A voltage source Vi representing a rising or falling transition is connected at the input of driver 130. In response to the input voltage Vi, the coupled RC interconnect network 132, and the load impedance Zr 136; the driver 130 generates an output voltage Vo at the one or more outputs of the stage(i). However, the description herein describes a model with a single output that may be readily duplicated for a standard cell with a plurality of outputs.

Referring now to FIG. 2A, a schematic diagram of an exemplary standard cell in a netlist is illustrated. This is the view seen by the electrical delay calculator working at a gate or net level abstraction layer. The standard cell includes a driver 130, the RC interconnect network 132 connected to the output of the driver consisting of one or more resistors 210-211 and one or more capacitors 221-224, the extracted parasitics 136 associated with the output net Vo 201 (see FIG. 1D) coupled together as shown. One or more receivers 138 are coupled to the output net Vo 201 and may add to the extracted parasitics 136. An aggressor driver 233 may generate an aggressor signal 250 coupled into the interconnect network 132. An aggressor receiver 238 may also influence the generation of the aggressor signal 250, adding additional parasitic load to the network 132.

FIG. 2B illustrates waveform diagrams 200, 250, and 201A-201B respectively of the Vin signal 200, the aggressor signal 250, and the victim or Vo output signal 201. The objective of the electrical delay calculator 102 is to calculate the waveforms at the output net Vo which is input to each of the receivers 138 of the net, and return quantities of interest about the waveform to the graph level abstraction layer. In this case, the delay calculator 102 applies the input signal Vin 200 as a stimulus when simulating the responses at the receiver inputs. For static timing analysis (STA), the quantity of interest is the timing delay from the input Vin 200 into the driving gate 130 and the output net Vo 201 that is coupled to the input of the receiver 138 in the next stage. For noise or signal integrity analysis, the quantity of interest may be the amount of crosstalk delay generated on the output net Vo 201 by the aggressor driver 233.

Without any aggressor driver 233 or when node 250 is quiet, the delay calculator 102 may generate a relatively smooth output waveform 201A on the Vo output signal 201 that has a timing delay TD0 not affected by coupling noise (or crosstalk). When aggressor driver 233 and node 250 are switching, the delay calculator 102 may generate a noisy output waveform 201B on the Vo output signal 201 that has a timing delay TDN which is affected by coupling noise that may be greater than the timing delay TD0 without coupling noise. That is, the switching of the aggressor driver 233 may cause additional delay in the signal generated by the stage on the output net Vo 201.

Models and Characterization

The multi-CCC current source model used in the delay calculator, may also be referred to herein as a ViVo II model. The multi-CCC current source model is capable of accurately supporting standard cells with both single-channel connected components (single-CCC) and multi-channel connected components (multi-CCC). Channel-connected components (CCCs) are found within standard circuit cells (or simply standard cells) of a standard cell library.

A single channel connected component (single-CCC) includes transistors connected to each other by their drain and/or source terminals between paths from the positive power supply VDD to the negative power supply VSS or ground. The boundary of a CCC is at a gate terminal or an input or output terminal of the standard cell.

Standard cells with multi-channel connected components (multi-CCCs) include a plurality of single-CCCs coupled in series together at gate terminals between inputs and outputs of the standard cell.

FIG. 3A illustrates an exemplary single-CCC standard cell 300A. The standard cell 300A is a NOR logic gate with sources/drains of transistors 301-304 coupled together between the positive power supply VDD and the negative power supply VSS. Standard cells for an inverter and NAND gate are also single-CCC standard cells. There are no other CCCs between the inputs IN1, IN2 and the output OUT.

FIG. 3B illustrates an exemplary multi-CCC standard cell 300B. The multi-CCC standard cell 300B includes a first single-CCC 310A and a second single-CCC 310B coupled in series together between the input IN and the output OUT of the standard cell 300B. The single-CCC 310A includes transistors 311-313. The sources/drains of transistors 311-313 are coupled together between the positive power supply VDD and the negative power supply VSS. A source or drain of transistor 313 couples to the gate terminals of transistors 314 and 315 at the boundaries of the first and second single-CCCs 310A-310B. The single-CCC 310B includes transistors 314-315. The sources/drains of transistors 314-315 are coupled together between the positive power supply VDD and the negative power supply VSS.

FIG. 3C illustrates another exemplary multi-CCC standard cell 300C. The multi-CCC standard cell 300C is an AND gate and includes a first single-CCC (NAND gate) 320A and a second single-CCC (inverter) 320B coupled in series together between the inputs IN1, IN2 and the output OUT of the standard cell 300C. The single-CCC 320A includes transistors 321-324. The sources/drains of transistors 321-324 are coupled together between the positive power supply VDD and the negative power supply VSS. The single-CCC 320B includes transistors 325-326. The sources/drains of transistors 325-326 are coupled together between the positive power supply VDD and the negative power supply VSS. Other exemplary multi-CC standard cells include a non-inverting buffer formed by a pair of inverters coupled in series together, an OR gate formed by a NOR gate coupled in series to an inverter, an exclusive-NOR (XNOR) gate formed by a pair of parallel NOR gates coupled in series to an additional NOR gate, and an exclusive-OR (XOR) gate formed by a pair of parallel NAND gates coupled in series to an additional NAND gate.

The ViVo II multi-CCC current source model (i) treats standard cells (with either single-CCCs or multi-CCS) as black boxes during characterization; (ii) compacts the model, which is independent of output load and much less dependent on the number of input slews to use during characterization; and (iii) encapsulates internal waveform distortion and internal delay in multi-CCC standard cells efficiently.

FIG. 4A illustrates an abstracted view of a multi-CCC standard cell, such as an XOR gate 400. The exemplary XOR gate 400 may be modeled by a voltage transform function 401 to transform the input voltage V_(i)(t) into an intermediate voltage V_(c)(t); and a last stage or driver stage 402 to generate an output voltage Vo(t) and an output current Io(t) in response to the intermediate voltage V_(c)(t). The voltage transform function 401 may also be referred to herein as a delay transfer function may represent one or more internal stages of a multi-CCC standard cell.

The goal of ViVo II multi-CCC current source model is to characterize the gate's driving capability and to provide a simple abstraction which captures the output current waveform in the presence of multiple internal stages. The current through a single CCC can be described accurately based on a two dimensional DC current function F(Vi(t), Vo(t)). For a multi-CCC cell the current Io(t) waveform at the output of the standard cell 400 is dictated by the instantaneous input voltage at the last CCC 402, which we denote as V_(c)(t). Thus, the current through a multi-CCC standard cell is a function of the instantaneous input voltage at the last CCC 402 which can be denoted by I=F(V_(c)(t), Vo(t)). In order to find V_(c)(t) from Vi(t), a waveform transfer function 401 can be used to map the input voltage transition to an intermediate voltage transition.

A multi-CCC current source model therefore may consist of two major components: (i) the dc current function modeling drawn current as a function of instantaneous input and output voltages and their time derivatives of the last CCC of the cell, and (ii) a waveform transfer function defining the waveform at the input of the last CCC as a function of the waveform at the cell's input.

A one straightforward way to construct these two parts is to perform a series of spice simulations where the node which is the input of the cell's lass CCC is directly probed or stimulated, respectively. However, while this approach is feasible, an understanding of the internal topology of the cell's circuit and a partition of the circuit into one or more CCCs must be performed. Instead, the embodiments of the invention treat a standard cell as a black box without having to understand the internal topology of a circuit and partition it into CCCs. Thus, the construction of the two components of the model is done through fitting the results of a series of spice simulations where excitation and probing points are only the standard cell's interface (e.g., input/output) pins.

ViVo II Multi-CCC Current Source Model

FIG. 4B illustrates the ViVo II multi-CCC current source model 410. The multi-CCC current source model 410 includes two parts as explained in the previous section.

The first part is an internal waveform transformation function 401 which transforms the input voltage V_(i)(t) into the intermediate voltage V_(c)(t) by Equation 1 as follows: V _(c)(t)=Γ(V _(i)(t))  (1)

Note that the intermediate voltage Vc(t) models a delay and distortion of the input signal transition as it propagates through a standard cell's circuit up until the input to the last CCC. Fitting techniques may be used to map the input signal to the intermediate voltage signal V_(c)(t).

The second part is a voltage dependent current source which characterizes the driving CCC 402. It consists of a voltage dependent current source I=F(V_(c), V_(o)) 412, which gives the driving current for any V_(c) and V_(o) value and their derivatives:

$\begin{matrix} {{F\left( {V_{c},V_{o}} \right)} = {{F_{dc}\left( {V_{c},V_{o}} \right)} + {{C_{M}\left( {V_{c},V_{o}} \right)}\frac{\mathbb{d}}{\mathbb{d}t}\left( {V_{c},V_{o}} \right)} - {{C_{g}\left( {V_{c},V_{o}} \right)}\frac{\mathbb{d}}{\mathbb{d}t}V_{o}}}} & (2) \end{matrix}$

In Equation 2, F_(dc) is a DC component of the current source defining the current value based on the values V_(c) and V_(o). The second and third terms in Equation 2 model the dynamic current due to Miller effect from input to the output of the last CCC of the cell and output pin capacitance of the cell. The coefficients of the two latter terms are nonlinear Miller and output pin capacitances which in general depend upon voltages Vc, Vo. However, since the contribution of the last dynamic term in Eq. (2) is usually small, characterizing the C_(g) for the initial input voltage Vi(t=0) suffices to provide sufficiently accurate results.

FIG. 5 illustrates the application of Γ(V(t)) which converts an input voltage waveform V_(i)(t) of slew σ into an intermediate voltage waveform V_(c)(t) in accordance with one embodiment of the invention. In one embodiment of the invention, the transformation function Γ which is used to generate the intermediate voltage Vc(t) in voltage transformation equation (Eq. 1) is as follows:

$\begin{matrix} {{V_{c}(t)} = {{\Gamma\left( {V_{i}(t)} \right)} = {V_{i}\left( {\frac{T_{i}}{F_{\sigma}\left( \frac{t - \tau_{\sigma}}{T_{\sigma}} \right)} + \tau_{i}} \right)}}} & (3) \end{matrix}$

In Equation 3, F_(σ)(ν) is a normalized time transfer function (time versus time) with time normalization being defined by

$v = {\frac{t - \tau_{\sigma}}{\tau_{\sigma}}.}$ As show by the input voltage V_(i)(t) versus time chart of FIG. 5, τ_(i) and T_(i) are respectively the starting time and the duration of the input voltage V_(i)(t) transition from high to low. Alternatively, τ_(i) and T_(i) may be the starting time and the duration of the input voltage V_(i)(t) transition from low to high, respectively.

As shown by the intermediate voltage Vc(t) versus time chart of FIG. 5, τ_(σ) is the starting time of the transition in the intermediate voltage V_(c)(t) and T_(σ) is the transition period of the intermediate voltage V_(c)(t).

The function F_(σ)(ν) captures the non-linear waveform shape change from V_(i)(t) to V_(c)(t). F_(σ)(ν), T_(σ) and τ_(σ) are all functions of the slew rate σ (change in voltage over time) of the input voltage V_(i)(t) and are stored in tables indexed by σ. FIG. 11 illustrates an exemplary table of values for T_(σ) and τ_(σ) as a function of a reference slew rate σ_(ref), a fast slew rate σ_(fast), and a slow slew rate σ_(slow) of the input voltage V_(i)(t). FIG. 12 illustrates an exemplary table of values for F_(σ)(ν) as a function of a reference slew rate σ_(ref), a fast slew rate σ_(fast), and a slow slew rate σ_(slow) over the normalized time ν which varies from 0 to 1.

In its application, the multi-CCC current source model captures the slew rate σ from the voltage input waveform V_(i)(t), which is then used to look up the corresponding values for T_(σ), τ_(σ) and F_(σ)(V) from look up tables, such as the tables illustrated in FIG. 11 and FIG. 12, respectively. The model then applies the voltage transformation equation (Eq. 3) to map the voltage points on V_(i)(t) to V_(c)(t) to convert an input waveform V_(i)(t) of slew rate σ to the intermediate voltage waveform V_(c)(t) in one embodiment of the invention. In another embodiment of the invention, a lookup table is used to convert the waveform V_(i)(t) of slew rate σ to the intermediate voltage waveform V_(c)(t).

If the standard cell being modeled by the multi-CCC current source model is a single-channel-connected component (single-CCC) standard cell, then the voltage waveform transfer function Γ can be simplified. In this case, the voltage waveform transfer function Γ is a constant such that the intermediate voltage waveform Vc(t) is substantially similar to the input voltage waveform V_(i)(t). In one embodiment of the invention, the voltage waveform transfer function Γ is a constant of one.

With the intermediate voltage waveform V_(c)(t), the output current waveform may be computed by using the intermediate voltage waveform V_(c)(t) as the dependent input of the current source model I_(o)(V_(c), V_(o)). The model may use a table to store I_(o)(V_(c), V_(o)), such as illustrated by FIG. 13, which is indexed by both V_(c) and V_(o). To compute output current at time to given a particular V_(c) and V_(o) at time t_(n−1), the model may first find the nearest voltages in the table and then perform a two-dimensional interpolation to approximate the actual output current at V_(c) and V_(o). The model may also look up C_(g) given V_(o) from another table, such as illustrated in FIG. 14. With the values of I_(o) and C_(g) computed at time t_(n), we can compute the value of V_(o) and move on to the next time point t_(n+1), at which we look up I_(o) and C_(g) again using V_(c) and V_(o) at time t_(n). This process repeats until the whole output waveform is computed.

ViVo II Model Characterization

The ViVo II multi-CCC model for gates is characterized from a blackbox view of a standard circuit cell. To characterize a ViVo II multi-CCC model, the voltage and current waveforms at inputs and outputs of the standard cell are observed. Characterization starts at block 1600 and jumps to block 1602.

At block 1602, the output current I₀ is characterized for the driving stage of the multi-CCC current source model. The flow chart of FIG. 17 illustrates the characterization of the output current of the multi-CCC standard cell in greater detail.

Referring now to FIG. 17, at block 1702, the output voltage V_(o) is fixed to a known voltage, such as zero volts.

To characterize the driving stage I₀(V_(c), V_(o)), transient simulations with a SPICE transistor circuit simulator, such as Spectre software by Cadence Design Systems, Inc. are used to switch the input to the standard cell with its output voltage V_(o) being fixed.

At block 1704, while holding the output voltage V_(o) fixed, a spice transistor simulation is run on the multi-CCC standard cell.

At block 1706, one input of the multi-CCC standard cell is switched using an input signal with an initial reference slew rate.

At block 1708, the output current waveform is measured and the results are tabulated such as in FIG. 13.

At block 1710, a determination is made as to whether or not the output voltage was set to the power supply voltage Vdd. If so, the process ends at block 99. If not, the process goes to block 1714.

At block 1714, the output voltage is incremented to a new value and the process returns to block 1704, to determine the output current for the new fixed value of output voltage Vo.

In the case of standard cells with only one CCC, performing a DC-analysis by sweeping V_(i) and V_(o) is sufficient to find I_(o)(V_(c), V_(o)). However for a multi-CCC standard cell, I_(o)(V_(c), V_(o)) a DC-analysis may not be used since the input voltage V_(i) does not equal the intermediate voltage Vc.

FIG. 6A shows three output current waveforms I_(o) ^(ref) which are obtained by applying an input ramp voltage V_(i)(t) with a reference slew rate σ_(ref) with different settings of fixed output voltage V_(o). These curves are stored in the current table I_(o)(V_(c), V_(o)) of FIG. 13 for current look-up. FIG. 6A further shows an output current waveform I_(o) ^(slow) which is obtained by applying the input ramp voltage V_(i) (t) with a slow slew rate σ_(slow).

At block 1604, the voltage transform function ΓV(t)) of the multi-CCC standard cell is characterized. The flow chart of FIG. 18 illustrates the characterization of the voltage transform function Γ(V(t)) of the multi-CCC standard cell in greater detail. Characterizing the functional Γ in Equation 1 requires extra simulations using different input slews than a reference slew rate σ_(ref).

At block 1802 of FIG. 18, the input signal slew rate is set to a first slew rate that is different form the reference slew rate. For example, the input slew rate may be changed to a slow slew rate σ_(slow).

At block 1804, the output voltage V_(o) of the multi-CCC current source model is fixed to ⅓ of Vdd for a rising output and ⅔ of Vdd for a falling output.

At block 1806, with the output voltage fixed, SPICE transistor circuit simulations are run with the multi-CCC current source model.

At block 1808, one input of the multi-CCC standard cell is switched using the input signal with the differing slew rate than the reference slew rate.

At block 1810, the output current I_(o) ^(slow) is measured and results may be tabulated. FIG. 6A illustrates an I_(o) ^(slow)(V_(c), V_(o)=x·V_(dd)) waveform which is obtained by changing input slew rate to σ_(slow), where x is a fraction of ⅓ for rising output and ⅔ for falling output.

At block 1812, the output current waveform is compared with the input signal waveform to determine the extra delay time in the transition periods to extract τ_(slow) and T_(slow) parameters, for example.

From I_(o) ^(slow)(V_(c), V_(o)=x·V_(dd)) waveform curve we observe that the output current waveform incurs an extra delay of τ_(slow)−τ_(ref) and its transition period stretches from T_(ref) to T_(slow) compared to the original reference current waveform I_(o) ^(ref)(V_(c), V_(o)=x·V_(dd)). T_(slow) and τ_(slow) are stored, in the table of FIG. 11 for example, for the input slew σ_(slow) as part of the parameter for characterizing the functional Γ. Moreover, we can capture the non-linear shape difference between I_(o) ^(ref)(V_(c), V_(o)=x·V_(dd)) and I_(o) ^(slow)(V_(c), V_(o)=x·V_(dd)) by normalizing the time-axis

${v = \frac{t - \tau_{\sigma}}{T_{\sigma}}},$ where σ=σ_(ref) and σ_(slow), respectively.

At block 1814, the output I_(o) ^(slow)(V_(c), V_(o)=x·V_(dd)) waveform curve is normalized using τ_(slow) and T_(slow) parameters. The reference waveform curve I_(o) ^(ref)(V_(c), V_(o)=x·V_(dd)) is normalized using its τ_(REF) and T_(REF) parameters. The normalized output waveform curve and the normalized reference curve are aligned together and equal-current time points are recorded for each output current for their respective slew rates, such as illustrated by FIG. 15. The equi-current normalized time information further simplifies the computations and reduces the amount of information that need be stored to model a multi-CCC standard cell. The equi-current normalized time information is used to further transform the output waveform, be it an output current waveform I_(o) or an output voltage waveform V_(o).

Referring now back to FIG. 18 at block 1816, a determination is made if all desired slew rates differing from the reference slew rated have been simulated. If so, the process goes to block 99 and ends. If not, the process goes to block 1820.

At block 1820, the input signal slew rate is set to the next slew rate differing from the reference slew rate. The process then returns to block 1804 where the characterization process is repeated.

FIG. 6B illustrates normalized current curves from which parameters to characterize F_(σ)(ν) may be extracted. This process may be repeated for a fast input slew σ_(fast) to more accurately characterize Γ.

The current table of FIG. 13 is characterized for at least one input voltage slew rate, a reference slew rate σ₀ or σ_(ref). In another embodiment of the invention, it is characterized for two slew rates, a fast slew rate σ₁ or σfast, and a slow slew rate σ₂ or σ_(slow). In another embodiment of the invention, it is characterized for at least three slew rates, the reference slew rate σ₀ or σ_(ref), the fast slew rate σ₁ or σ_(fast), and the slow slew rate σ₂ or σ_(slow). The more characterization data, the better the interpolation accuracy with respect to input slew.

To adapt the characterized output currents to input voltage signals with different slew rates, the values in the current table are adjusted. With a multi-CCC standard cell, there are first and second order adjustments to be made. With a single-CCC standard cell, a first order adjustment for a different slew rate may only be made.

Referring now to FIG. 5B, a first-order-only-transformation (applying Γ to the first order) of the voltage input waveform Vi into an output current waveform Io is illustrated. A reference voltage input waveform 510 was previously used to generate the tabulated output current waveform 515. A voltage input waveform 512 with a new slew rate (indicated by the slope) and a delayed start (indicated by the offset from time zero) is coupled into the single-CCC standard cell. The new voltage input waveform 512 results in a new output current waveform 517. The output current waveform 518 is the result of a SPICE transistor circuit simulation for comparison with the output current waveform 517 of the multi-CCC model.

A first order output adjustment to the output current waveform is due to the change input slew rate illustrated by the slope of waveform 511 and the delayed start of the input illustrated by the time offset between waveforms 511 and 512. The change in slope of the input waveform (illustrated by the difference between waveforms 511 and 510) results in a change in slope in the output waveform as illustrated by the difference between output waveforms 515 and 516. The delayed start in the input waveform (illustrated by the difference between waveforms 512 and 511) results in a delayed start in the output waveform as illustrated by the difference between output waveforms 517 and 516. The change in slope is established by a stretch parameter T. The change in start time is established by a shift parameter τ.

A second order output adjustment to the output current waveform is the result of the extra gate stages in a multi-CCC standard cell. The new voltage input waveform is coupled into a different gate than that of the last driving stage of a multi-CCC standard cell. The second order adjustment to the output current waveform is illustrated by the difference between output waveforms 518 and 517. The second order output adjustment is modeled by a time transformation function Γ that is responsive to the new input slew rate.

If the standard cell is a simple single-CCC standard cell, the time transformation function is u=ν, where ν is the normalized time with respect to the current table and u is the normalized simulation time. That is, there is no second order output adjustment to be made to a simple standard cell with a single-CCC. The first order output adjustment may be made to a simple standard cell with a single CCC.

Referring now to FIG. 5C, the characterization of a time transformation function Γ is now described. A voltage input waveforms V_(i) and its respective output current I_(o) over time are plotted in the left chart. Output current waveforms Io normalized for time are plotted in the right chart.

From the plots of voltage input waveforms Vi with different slew rates and their respective output current Io, the shift parameters τ and the stretch parameters T are first measured. The shift parameters τ and the stretch parameters T for each voltage input waveform and its respective slew rate may be tabulated, such as illustrated in FIG. 11.

The output current waveforms Io are aligned and normalized for time over U from zero to one, such as illustrated in the right chart of FIG. 5C. Three output current waveforms Io 530A-530C are illustrated in the right chart of FIG. 5C with slew rates σ₁, σ₀, and σ₂, respectively. A plurality of equi-current points I_(i) are selected and their normalized times U for all of the output current waveforms Io 530A-530C with their respective slew rates are recorded into a table, such as the table illustrated in FIG. 15.

For example, consider the equi-current point I_(i) illustrated in the right chart of FIG. 5C that intersects the waveforms 530A-530C at points 531A-531C, respectively. At point 531A on waveform 530A, the normalized time is Z_(i). At point 531C on waveform 530C, the normalized time is Y_(i). At point 531B on waveform 530B, the normalized time is X_(i). These normalized time points are tabulated in FIG. 15.

As another example, consider the equi-current point I_(i+1) illustrated in the right chart of FIG. 5C that intersects the waveforms 530A-530C at points 532A-532C, respectively. At point 532A on waveform 530A, the normalized time is Z_(i+1). At point 532C on waveform 530C, the normalized time is Y_(i+1). At point 532B on waveform 530B, the normalized time is X_(i+1). These normalized time points are also tabulated in FIG. 15. Additional equi-current points are selected and their respective normalized times for each waveform and slew rate are tabulated. The greater the number of equi-current points selected the better the accuracy of the model. Additionally the greater the number of output currents characterized for different input slew rates, the better the accuracy of the model.

Referring now to FIG. 5D, the equi-current values of the output current waveform with their respective slew rates can be inverted and normalized with respect to time in order to form time transformation curves 551, 552 illustrated in FIG. 5D. That is, FIG. 5D illustrates time versus time plots plotted from FIG. 5C. Time transformation waveforms 551, 552 with respective slew rates of σ₁ and σ₂ are illustrated in FIG. 5D.

With curves 551 and 552, a new intermediate voltage waveform 530 with respect to a new slew rate σ_(new) may be readily interpolated by applying the second order adjustment. The interpolation is to construct an intermediate waveform for a multi-CCC standard cell to assist in output current look-up during simulation. The curves 551 and 552 of FIG. 5D may be stored in a table, such as illustrated in FIG. 15, as piece-wise linear time versus time curves.

The characterized time transformation curves of FIG. 5D for the slew rates σ₁ and σ₂ may be saved and used as part of the multi-CCC current source model. After determining a new slew rate of an input voltage waveform to a multi-CCC standard cell, the characterized time transformation curves 551-552 of FIG. 5D for the slew rates σ₁ and σ₂, respectively, may be utilized to interpolate a new time transformation curve 550 associated with the new slew rate σ_(new) of the input voltage waveform.

At a normalized time of u₁ in FIG. 5D, curves 551 and 552 have normalized equi-current values of Y₁ and Z₁, respectively. The new transformation curve 550 has an interpolated value of W₁ at a normalized time of X₁. Equivalent ratios may be set up to interpolate all values of W along the curve 530 as follows:

$\begin{matrix} {\frac{y - x}{\sigma_{1} - \sigma_{new}} = \frac{y - z}{\sigma_{2} - \sigma_{1}}} & (4) \end{matrix}$

for all values of normalized time u and each respective value of y and z. The equation may be solved for the value w along the curve 530 as follows:

$\begin{matrix} {w = {y\left\lbrack {1 - \frac{\sigma_{1} - \sigma_{new}}{\sigma_{2} - \sigma_{1}} + {z\frac{\sigma_{1} - \sigma_{new}}{\sigma_{2} - \sigma_{1}}}} \right\rbrack}} & (5) \end{matrix}$

Referring now to the left graph illustrated in FIG. 9, the input voltage waveform is then normalized by shifting the starting time point to zero at the origin and scaling the time axis so that the normalized input waveform V_(i) 900 goes from the normalized time of zero to one.

Using the new time transformation curve 550, new time points are generated from the new input voltage waveform 900 to begin its transformation into the intermediate voltage waveform V_(c)″ 901 as illustrated by the right graph in FIG. 9.

Using the new slew rate σ_(new), values for a new shift parameter and a new stretch parameter may be interpolated from a parameter look up table, such as the table illustrated in FIG. 11. A pair of parameter values τ₁ and τ₂ with respective slew rates σ₁ and σ₂ around the new slew rate σ_(new) are chosen. A new shift parameter τ_(new) may be interpolated from the equivalent ratios in the following equation:

$\begin{matrix} {\frac{\tau_{1} - \tau_{new}}{\sigma_{1} - \sigma_{new}} = \frac{\tau_{1} - \tau_{2}}{\sigma_{1} - \sigma_{2}}} & (6) \end{matrix}$

The equation may be solved for the new shift parameter value τ_(new) as follows:

$\begin{matrix} {\tau_{new} = {\tau_{1}\left\lbrack {1 - \frac{\sigma_{1} - \sigma_{new}}{\sigma_{1} - \sigma_{2}} + {\tau_{2}\frac{\sigma_{1} - \sigma_{new}}{\sigma_{1} - \sigma_{2}}}} \right\rbrack}} & (7) \end{matrix}$

A pair of parameter values T₁ and T₂ with respective slew rates σ₁ and σ₂ around the new slew rate σ_(new) are chosen. A new stretch parameter T_(new) may be interpolated from the equivalent ratios in the following equation:

$\begin{matrix} {\frac{T_{1} - T_{new}}{\sigma_{1} - \sigma_{new}} = \frac{T_{1} - T_{2}}{\sigma_{1} - \sigma_{2}}} & (8) \end{matrix}$

The equation may be solved for the new stretch parameter value T_(new) as follows:

$\begin{matrix} {T_{new} = {T_{1}\left\lbrack {1 - \frac{\sigma_{1} - \sigma_{new}}{\sigma_{1} - \sigma_{2}} + {T_{2}\frac{\sigma_{1} - \sigma_{new}}{\sigma_{1} - \sigma_{2}}}} \right\rbrack}} & (9) \end{matrix}$

Referring now to FIG. 10, the intermediate voltage waveform V_(c)″ 901 is further transformed by the stretch parameter value T_(new) by stretching it into the intermediate voltage waveform V_(c)′ 1001. The intermediate voltage waveform V_(c)′ 1001 is finally transformed by the shift parameter value τ_(new) by shifting it into the final intermediate voltage waveform V_(c) 1002.

At block 1606, the parasitic capacitance of the standard cell for the multi-CCC current source model is characterized. The flow chart of FIG. 19 illustrates the characterization of the parasitics of the standard cell in greater detail.

At block 1902, all the inputs of the multi-CCC standard cell are set to a constant logic level input voltage. At block 1904, a voltage source is coupled to the output of the multi-CCC standard cell. With the input voltage Vi being held constant, the intermediate voltage level Vc is also held constant.

At block 1906, while holding the inputs to the multi-CCC standard cell fixed, a SPICE transistor circuit simulation is run of the transistors in the given multi-CCC standard cell.

At block 1908, to characterize C_(g)(V_(o)), the voltage source at output applies a voltage ramp with a slew rate σ_(o) at the output of the multi-CCC standard cell.

At block 1910, the current (I_(meas)) going through the voltage source at the output of the multi-CCC standard cell which asserts the voltage ramp is measured.

At block 1912, the expected initial output current I_(o)(V_(c)(t=0) , V_(o)) may be looked up from a current table, such as the table illustrated in FIG. 13, given that we set the output voltage V_(o) and we estimated the intermediate voltage V_(c)(t=0) at time zero.

At block 1914, given the foregoing information, C_(g)(V_(o)) can be computed by using Eq. 10 as follows:

$\begin{matrix} {{Cg} = \frac{\left( {I_{meas} - {I_{o}\left( {{V_{c}\left( {t = 0} \right)},V_{o}} \right)}} \right) \cdot \sigma_{o}}{V_{dd}}} & (10) \end{matrix}$ where I_(meas) is the measured current and I_(o)(V_(c)(t=0), V_(o)) is the initial output current that may be looked up from a current table.

At block 1608 in FIG. 16, the miller capacitance of the multi-CCC current source model may also be characterized.

Referring now to FIG. 20 and FIG. 4C, a method of characterizing the miller capacitance (C_(miller) or C_(m)) of the multi-CCC current source model is now described.

At block 2002, all the inputs 422 but one input 421 of the multi-CCC standard cell 420 are set to a constant logic level input voltage. They may be set to a constant high logic level by coupling to the positive power supply voltage VDD or a constant low logic level by being coupled to ground VSS.

At block 2004, a fixed voltage source V_(fixed) is coupled to the output of the multi-CCC standard cell 420. The fixed voltage source V_(fixed) may be fixed to a constant positive power supply voltage level (VDD) in one embodiment of the invention or a constant zero volts in another embodiment of the invention.

At block 2006, while holding the output voltage of the multi-CCC standard cell fixed to the fixed voltage source V_(fixed), a SPICE transistor circuit simulation is run of the transistors in the given multi-CCC standard cell.

At block 2008, to characterize the miller capacitance C_(m), a voltage source applies a voltage ramp with a fast slew rate σ_(fast) at the input 421 to the multi-CCC standard cell 420. The slew rate of the voltage ramp should be as fast as possible for best results.

At block 2010, the output current (I_(out)) going through the fixed voltage source is measured and plotted over time in response to the voltage ramp at the input 421 of the multi-CCC standard cell.

At block 2012, the miller current I_(miller) or I_(m) is determined and a time delay S in the change of the output current is also determined from the plotted output current. The time delay S is used as the change in the time period for the voltage decay over the miller capacitor.

Referring now to FIGS. 22A-22C, plots of exemplary waveforms for the input voltage ramp Vi, intermediate voltage Vc, and the output current I_(out) are illustrated in the case that the fixed voltage source is set to the positive power supply voltage VDD. FIGS. 23A-23C illustrate plots of exemplary waveforms for the input voltage ramp Vi, intermediate voltage Vc, and the output current I_(out) in the case that the fixed voltage source is set to the zero volts.

In either case, the miller current is a current that results because the miller capacitor resists an instantaneous change in voltage. The miller current flows from the input to the driver stage of the multi-CCC current source model through the miller capacitor to the output node Vo. The miller current is the instantaneous change in current illustrated in FIGS. 22C and 23C as a result in the initial change in the intermediate voltage Vc in FIGS. 22B and 23B. The driver stage of multi-CCC current source model has yet to turn on and provide a current. Thus, the measured output current is the miller current prior to the driver stage turning on and driving a current into the output node.

The current through a capacitor is known to be proportional to the product of the capacitance and a time derivative of the voltage. The latter can be approximated by a change in voltage divided by a change in time:

$\begin{matrix} {I_{m} = {C_{m}\frac{\delta\; v}{\delta\; t}}} & (11) \end{matrix}$

Rearranging Eq. 11 to solve for the miller capacitance we get:

$\begin{matrix} {C_{m} = \frac{I_{m}}{\left( \frac{\delta\; v}{\delta\; t} \right)}} & (12) \end{matrix}$

At block 2014, the change in voltage over time in the miller capacitor is estimated using the time delay S. That is, dV/dt is congruent to the positive power supply voltage VDD divided by the time delay S or VDD/S.

At block 2016, the miller capacitance is calculated using Eq. 12 and the measured miller current Im through the miller capacitor Cm and the change in voltage over time VDD/S across the miller capacitance. After the miller capacitance is determined for the given multi-CCC standard cell, it is stored with the other parameters of the multi-CCC current source model.

After the miller capacitance is determined, the characterization of the miller capacitance ends at block 2099.

Generally, the multi-CCC current source model is efficient in the runtime that is required to characterize the model, as well as the amount of data storage need to preserve its parameters. The multi-CCC current source model can achieve sufficient accuracy by keeping seven V_(o) values and twenty time samples of I_(o) ^(ref)(V_(c)(t), V_(o)) for each V_(o) in the I_(o)(V_(c), V_(o)) table of FIG. 13. C_(g)(V_(o)) may require only seven V_(o) values in its table of FIG. 14. It is also sufficient to store values of T_(σ), τ_(σ) and F_(σ)(ν) for three different input slew rates, a reference input slew σ_(ref), a slow input slew σ_(slow), and a fast input slew σ_(fast) that may be stored in tables, such as tables illustrated in FIGS. 11 and 12. Characterizing these parameters may take about ten transistor circuit simulations using a transistor circuit simulator, such as Cadence Design Systems, Inc.'s Spectre transistor circuit simulator, compared to about eighty transistor circuit simulations that may be required for other gate models.

Delay Calculation for Application Specific IC Design

The embodiments of the invention may be used with or in a static timing analyzer for analyzing the timing of an integrated circuit.

Referring now to FIG. 21 and FIGS. 1C-1D, a timing analysis of the circuit netlist of FIG. 1D may be made starting at block 2100 in FIG. 21 which jumps to block 2102.

At block 2102, a register-transfer-level netlist is analyzed to partition a circuit into stages. The stages are further levelized to perform static timing analysis. Each stage may include one or more standard cells and associated interconnect.

At block 2104 in each stage, one or more standard cells are modeled using a multi-CCC current source model. If a standard cell is a single-CCC standard cell, the multi-CCC current source model may still be used with the voltage transform function having a unity value of one such that the intermediate voltage is the input voltage.

At block 2106 in each stage, the coupled RC interconnect network may be generated from a parasitic extraction after a circuit is laid out or the parasitics may be generated in response to the netlist after logic synthesis and possibly a floor plan of the functional blocks of the circuit, if available. The parasitics of the coupled RC interconnect network in each stage are modeled using a reduced order model (ROM).

At block 2108, a determination is made as to whether or not the system is in a concurrent calculation mode. A concurrent calculation mode includes a noise or signal integrity analysis as part of the multi-CCC current source model. If not, the process goes to block 2110. If so, the process goes to block 2112.

At block 2110, the delay in each stage is computed using the modeled current of the multi-CCC current source model and the modeled parasitics of the reduced order model (ROM). The process then goes to block 2120.

At block 2112 for each stage, assuming concurrent calculation mode, the response on the output of each stage due to each noise aggressor transition is computed and tabulated. The process may then go to block 2114.

At block 2114 for each stage, the combined response on the output of each stage in response to all noise aggressor transitions may be computed and tabulated.

Next at block 2116, for each stage, the delays and the sensitivities to all noise aggressors and process variations are computed via simulation using the multi-CCC current source model and the reduced-order model (ROM) for the associated RC interconnect. The receiving gates in each stage are modeled using constant capacitors. The process then goes to block 2120.

At block 2120, the calculated delays of each stage are used by a static timing analysis tool to determine the critical delay paths. The process goes to block 2199 and ends.

Stage Delay Calculation Under Process Variations

The multi-CCC current source model may be used to perform timing delay calculations on a stage of a circuit in the presence of process variations. Process variations can effect the interconnect as well as the transistors used in the logic cells of a standard cell library. For example, a metallization process is used to manufacture the interconnect within an integrated circuit. During the metallization process, the sheet resistance may vary in the metal as well as the width and thickness of metal lines due to process variations and change the impedance.

Referring now to FIG. 24, a circuit stage 2400 is illustrated including a driver 2401 connected to a plurality of receivers 2402A-2402N through an interconnecting net 2403. The stage 2400 is modeled by a circuit consisting of the net's parasitics and its driver 2401 and receivers 2402A-2402N. For the sake of simplicity, a net is assumed to have a single driver as shown. However, the methods may be adopted with modification for the general case of multiple driving stages.

For calculation of STA delays at the driver output X1 2420 and receiver inputs Y1-YN 2422A-2422N, the transition at the driver input is required. Correspondently, the delay calculator computes voltage responses at the so-called probing points Yd, Y1-YN (2420, 2422A-2422N in FIG. 24)— nodes which are connected to output of the driving gate and inputs of receiving gates, respectively.

For calculation of the responses at the probing points Yd, Y1-YN 2400, 2422A-2422N, a state-space formulation is used. A vector of voltages V (v₁, . . . , v_(N+1)) is formed at nodes of the RC network in the stage 2400. The vector V of voltages may be formed so that v_(l) denotes v_(d)—a voltage on the output node from the driver 2401 as shown in FIG. 24, and v₂, . . . , v_(N+1) denote respectively voltages at input nodes of the receiving gates—v_(r1), . . . , v_(rN).

To enable an efficient and accurate delay calculation, the nonlinear parts of the stage are approximated using appropriate models. The driver 2401 is modeled with the multi-CCC current source model described previously. The driver 2401 includes a voltage controlled current source 2412 and a capacitance C_(g) 2414. Calculation of responses at the stage's probing points is performed after responses are computed at the previous stages and parameters of input transitions, such as slews and delays, are determined at the inputs of the stage being analyzed.

During calculation of responses, it is assumed that voltage at one of the inputs of the driving gate is transitioning (either rising or falling) and this causes some transition at the nodes of the driven interconnect. We can assume that for each input pin of the driving gate, direction of transition at the input and output pins and logical values at other input pin, there exists a unique current source model describing current at the output pin as a function of voltage transitions at the switching input and output pins: I=I_(drv)(v_(in)(t), v_(out)(t)). However, since transition at the inputs of the driving gate are known at the time of delay calculation at the stage, the driver current source can be represented as a function of time and voltage at the output node of the driving gate: I=I_(drv)(t, v_(out)(t)).

For a given switching input pin, directions of transitions at the input and the output of the driving gate and logical values at the other inputs, the current drawn by the driver is thus a known function of time t and voltage v₁ and may be designated as I_(drv)(t, v₁).

Each of the receivers or receiving gates 2402A-240@N may be modeled using a constant input capacitor C_(in) 2416 extracted from a standard cell library for the respective type of cell or gate.

Kirchhoff's current law (KCL) equations regarding the principle of conservation of electric charge, may be applied to describe the stage 2400 as follows:

$\begin{matrix} {{{{C\frac{\mathbb{d}v}{\mathbb{d}t}} + {Gv}} = {BI}_{drv}},} & (13) \end{matrix}$ y=Lv  (14)

In the left-hand side of Eq. 13, C is a capacitance matrix, G is a conductance matrix, and v is the voltage vector. The vector y={v₁, v₂, . . . , v_(M+1)} denotes voltages at the probing points which include output of the driver and inputs to the receiving gates of the M receivers 2402A-2402N as shown in FIG. 24.

In the right-hand side of Eq. 13, 14, the matrices B and L are respectively input and output position matrices, and I_(drv) is the current drawn by the driver current source.

The input capacitors modeling the receiver gates 2402A-240@N may be added into the capacitance matrix C.

The set of equations (13, 14) is sufficient to calculate responses at the probing points, which may be achieved via simulation of the circuit using numerical integration of the governing equations (13, 14). Note that the current source model for the driver is different for different input switching pins, input and output direction transition and values at side (other) inputs. That is, for each such configuration of the driver, a separate simulation is required.

Since RC interconnect may include hundreds or even thousands of resistors and capacitors, it is usually expensive to integrate Eqs. (13, 14) with highly sparse matrices G, C. In order to make simulation more efficient a model-order reduction (MOR) may be performed to generate a load model (a reduced order model ROM) of the RC interconnect. Model-order reduction is generally described in U.S. Patent Application Publication No. 2006/0095236A for U.S. patent application Ser. No. 10/932,406 filed on Sep. 2, 2004 by Joel R. Phillips and incorporated herein by reference. The model-order reduction results in much more compact state-space equations with very little loss of accuracy. The reduction produces a reduced-order model (ROM) for the interconnect parasitics, which also includes receiver pin capacitors. After the reduced-order model (ROM) for the interconnect parasitics is generated, the state-space equations can be formulated in this conventional form:

$\begin{matrix} {{E\frac{\mathbb{d}x}{\mathbb{d}t}} = {{Ax} + {Bu}}} & (15) \end{matrix}$ y=Cx  (16)

Note that matrix C in Eq. (16) is unrelated to the capacitance matrix used in Eq. (13). The vector x is the state vector, which usually has much smaller dimension that original vector of node voltages. Vector y is the vector of probing points as before, and u in the right-hand side of Eq. (15) is the driver current I_(drv). The input to the ROM, which is the node where driver is connected to, and the outputs, which are nodes where receiving gates are connected to, are often referred to as port and taps, respectively. Matrices E, A are of much smaller size than before reduction.

Generally, both linear and nonlinear elements of a circuit are functions of process parameters. Let a vector λ={λ_(n)} with n=1, . . . , P denote a vector of interconnect and cell process parameters. It is assumed that the capacitance and the conductance matrices of the original state-space system C(λ), G(λ) and driver current source I_(drv)(t, v, λ) are known functions of process parameters. Likewise, the state-space matrices of the reduced system A, E are also functions of process parameters. Moreover, the capacitance matrix C(λ), the conductance matrix G(λ), the driver current source I_(drv)(t, v, λ), of the original stage-space system and the state-space matrices A, E of the reduced state-space system can also be modeled so that the effects of variation of temperature and variation in power supply voltage Vdd can be accounted for.

For a fixed vector of process parameters λ the port and tap responses can be determined by solving both of the equations (5, 6). This may be done for instance using trapezoidal integration method. Since excitation u is a nonlinear function of the port voltage, Newton-Raphson iterations are used at each time step. This means that the responses and correspondent delays are implicitly functions of process parameters.

The delay calculation problem of the stage 2400 may be formulated as a problem of finding the port and tap responses y and the correspondent delays and slews as functions of vector λ. Some delay characteristics are of particular interest in the presence of process variations. The timing delay of the stage (the “stage delay”) is of interest at a particular point of the subspace of process parameters, referred to as a process parameter vector (PPV). The maximum (and minimum) values of the stage delay within a certain range (subspace) of process parameters may be of interest. Moreover, the sensitivity of the stage delay with respect to process parameters at a particular process parameter vector may be of interest.

In the presence of large variations in process parameters, one approach to model the stage delay is to choose a representative set of process parameter vectors, often referred to as set of process corners, and perform a delay calculation at each process corner. The selection of the corners is usually done in such a way as to cover the feasible space of process variations and ensure that the maximum and/or minimum timing delays are reached at least one of the chosen corners. However with a large number of process parameters, the number of corners to ensure a conservative analysis may be too high for the process corner approach of analyzing timing delays to be practical.

However, all or several of the process parameters may vary within a relatively small range. In this case, an efficient technique to model the timing delay with process variations is as a linear function of the process parameters. This approach is based on a sensitivity analysis. The sensitivity of delay is defined as a derivative of the timing delay with respect to a varying parameter. Since the behavior of timing delay in a sufficiently small vicinity of a chosen process parameter vector is linear with respect to the process parameters, knowing the delay and its sensitivities at a process parameter vector provides a good model for the delay in the vicinity of the process parameter vector.

Calculation of Delay, Slew and their Sensitivities to Process Variations

An algorithm for the calculation of the stage delay and delay sensitivity at a given process parameter vector is now described with reference to FIG. 24.

A state-space system for the voltage responses at the output port 2420 of the driver 2401 and receiver inputs 2422A-2422N of the receivers 2402A-2402N in the presence of process variations may be written as

$\begin{matrix} {{{E(\lambda)}\frac{\mathbb{d}x}{\mathbb{d}t}} = {{{A(\lambda)}x} + {{Bu}(\lambda)}}} & (17) \end{matrix}$ y=Cx  (18)

Since both matrices and excitation vector depend on process parameter vector λ, the solution must depend on λ as well.

In order to find sensitivity of the stage delay with respect to process parameters at a given process parameter vector, the state-space system as well as responses are expanded in Taylor series around some nominal value of the process parameter vector λ=λ_(nom).

Assuming that small variations of process parameters around their nominal values cause the variation of responses to be also small, the circuit responses in the vicinity of the nominal vector of process parameters can be sought in the form of a Taylor series with respect to the deviation of the process parameter vector from its nominal value: δ=λ−λ_(nom): A=A ⁽⁰⁾+Σδ_(n) A _(n) ⁽¹⁾+ . . .   (19) E=E ⁽⁰⁾+Σδ_(n) E _(n) ⁽¹⁾+ . . .   (20) u=u ⁽⁰⁾+Σδ_(n) u _(n) ⁽¹⁾+ . . .   (21) x=x ⁽⁰⁾+Σδ_(n) x _(n) ⁽¹⁾+ . . .   (22)

In equations 19-22, the zero-order terms A⁽⁰⁾, E⁽⁰⁾, u⁽⁰⁾, x⁽⁰⁾, correspond to nominal matrices excitation and states which are taken at λ=λ_(nom). In this approach which uses Z-formulation, the matrices B and C do not depend on process parameters and therefore do not need to be expanded. The first-order terms are summations of a product of the deviation δ_(n) of process parameter λ_(n) from its nominal value and the sensitivity (or partial derivative) of the correspondent function with respect to this process parameter, e.g.

${{A_{n}^{(1)} = \frac{\partial A}{\partial\lambda_{n}}}}_{{\lambda_{n} = \lambda_{n}},{nom}}$

At zero order we have the following problem:

$\begin{matrix} {{E^{(0)}\frac{\mathbb{d}x^{(0)}}{\mathbb{d}t}} = {{A^{(0)}x^{(0)}} + {Bu}^{(0)}}} & (23) \end{matrix}$ y ⁽⁰⁾ =Cx ⁽⁰⁾  (24)

Before formulating the first-order problem allowing sensitivity calculations, notice that since u=I_(drv)(t, v₁(λ), λ) depends on process parameters via two latter arguments, the sensitivity with respect to (w.r.t.) λ_(n) is

$\begin{matrix} {{{u_{n}^{(1)} = \frac{\partial I_{drv}}{\partial\lambda_{n}}}}_{{\lambda_{n} = \lambda_{n}},{nom}} + {{g(t)}*v_{1,n}^{(1)}}} & (25) \end{matrix}$

In Equation 25, g(t) is the small-signal admittance of the current at the nominal voltage response:

$\begin{matrix} {{{g(t)} = \frac{\mathbb{d}{I_{drv}\left( {t,v_{d}} \right)}}{\mathbb{d}v_{d}}}}_{v_{d} = y_{1}^{(0)}} & (26) \end{matrix}$

The two components in the first-order correction of driver current are due, respectively, to variation of the gate driving strength itself, and due to change in driver output response.

At the first order we obtain a set of linear problems, one for each process parameter as follows:

$\begin{matrix} {{{E^{(0)}\frac{\mathbb{d}x_{n}^{(1)}}{\mathbb{d}t}} - {A^{(0)}x_{n}^{(1)}} - {{{Bg}(t)}y_{1,n}^{(1)}}} = {{A_{n}^{(1)}x^{(0)}} - {E_{n}^{(1)}\frac{\mathbb{d}x^{(0)}}{\mathbb{d}t}} + {Bu}_{n}^{(1)}}} & (27) \end{matrix}$ y _(n) ⁽¹⁾ =Cx _(n) ⁽¹⁾  (28)

In equation 27, y_(1,n) ⁽¹⁾, is first element of vector y_(n) ⁽¹⁾, which is the sensitivity of driver output response w.r.t. parameter λ and it can be expressed via x_(n) ⁽¹⁾ using Eq. (28).

Equations 27, 28 are linear with respect to sensitivity values. All quantities in the right-hand side of equations 27, 28 are known since they depend on the nominal response which is found from equations 23, 24. The sensitivities can be calculated from equations 27, 28 using different numerical methods for solving a set of linear ordinary differential equations. For instance, a trapezoidal numerical integration method can be used to calculate the sensitivities using equations 27, 28.

In another embodiment of the invention, the total delay under nominal conditions may initially be computed. The non-linear circuit equations for the stage including current source model for the driver I_(drv) and ROM for interconnect may be formulated in their parameterized form with respect to the process parameter vectors. The port and tap responses as well as the equations and the driver current equations may be expanded around the nominal values of process parameter. The sensitivities of the responses and hence delays to process variations may be determined from a set of linear equations (27, 28) obtained by the application of a perturbation method to original equations (17, 18).

Results

Digital electrical analysis engines are usually compared against a SPICE-like transistor level circuit simulator, such as Cadence Design Systems, Inc. Spectre transistor level circuit simulator product. A number of tests have been performed to validate the accuracy of the multi-CCC current source model. A comparison was made on a stage by stage basis. The basic structure of all netlists is a three-stage gate chain. The test-suite has thousands of combinations of input slews, drivers, interconnect topologies, lengths and sizes. To validate nominal delay, noise coupling capacitors of the interconnect, if any, are coupled to ground. Each of the cells in the standard cell library, such as a commercial 90 nm technology cell library, is completely characterized for the multi-CCC current source model beforehand. The library models for the electrical simulation engine may also be fine tuned to achieve greater accuracy.

Referring now to FIG. 7, voltage waveform results of a static timing analysis using the digital delay calculator with a multi-CCC current source model and transistor level simulations generated by Cadence Design System, Inc.'s Spectre transistor level simulator are plotted for comparison.

The test case used to generate the plots of FIG. 7 was three stages of AND gates coupled in series together with an interconnect network with a maximum span of 200 microns (μm). An AND gate is a multi-CCC standard cell with its driver stage being an inverter. The ramp input voltage waveform V_(i)(t) 701 coupled to the input of the multi-CCC standard cell in the first stage had a slew rate of 100 pico-seconds (ps). The other curves plotted in FIG. 7 are pairs of curves both generated at the following stages: input voltage V_(i)(t) 702 at stage 2, input voltage V_(i)(t) 703 at stage 3, and output voltage V_(out)(t) 704 at the output port of stage 3. The calculated results from the static timing analysis using the digital delay calculator and the simulated results of the transistor level simulator are substantially similar such that the pairs of curves are indistinguishable from each other at each stage.

Referring now to FIG. 8, a plot of timing delays calculated with the delay calculator (EOS) versus those simulated with a spice transistor level simulator, such as Spectre simulator by Cadence Design Systems, Inc., is illustrated. A forty-five degree line illustrating a perfect match is also drawn to see how well the static timing results match that of the transistor level simulated results. As shown in FIG. 8, the timing delay determined using delay calculator (EOS) with a multi-CCC current source model substantially matches the timing delay simulated by the Spectre transistor level simulator in most cases.

While the output results of the static timing analysis may be substantially similar, there may be other cases where a lesser level of accuracy may be acceptable. Depending on the usage scenario, different applications may need different levels of accuracy. For example, during cell placement, we may want to perform delay calculations using lookup models without considering any signal integrity issue. However during sign-off of a integrated circuit design for manufacture, it may be desirable to calculate the timing delays with noise effects using the fully extracted parasitics. For some critical paths, the most accurate delay calculations may be desirable with results substantially similar to that achieved using a SPICE transistor level simulation. The software infrastructure of static timing analyzer EOS with the multi-CCC current source model can support such different usage scenarios.

CONCLUSION

When implemented in software, the elements of the embodiments of the invention are essentially the code segments to perform the necessary tasks. The program or code segments can be stored in a processor readable medium or transmitted by a computer data signal embodied in a carrier wave over a transmission medium or communication link. The “processor readable medium” may include any medium that can store or transfer information. Examples of the processor readable medium include an electronic circuit, a semiconductor memory device, a read only memory (ROM), a flash memory, an erasable programmable read only memory (EPROM), a floppy diskette, a CD-ROM, an optical disk, and a magnetic disk. The program or code segments may be downloaded via computer networks such as the Internet, Intranet, etc.

The embodiments of the invention are thus described. While embodiments of the invention have been particularly described, they should not be construed as limited by such embodiments. For example, the delay calculator's primary use is as a common timing computing engine to perform static timing analysis. However, its software infrastructure allows it to be portable and used with different design databases, timing library environments, and ECAD design tools. Instead, the embodiments of the invention should be construed according to the claims that follow below. 

What is claimed is:
 1. A model for standard cells to perform static timing analysis and sensitivity analysis of an integrated circuit design under process variations, wherein the model is stored as software in a storage device for execution with a computer, the model comprising: a voltage waveform transfer function to receive an input voltage waveform and transform it into an intermediate voltage waveform, wherein the voltage waveform transfer function captures the non-linear waveform shape change from the input voltage waveform to the intermediate voltage waveform in response to a standard cell being modeled; a voltage dependent current source to generate an output current in response to the intermediate voltage waveform; and an output capacitor coupled in parallel to the voltage dependent current source.
 2. The model of claim 1, wherein a capacitance of the output capacitor is responsive to an output voltage across the voltage dependent current source and the intermediate voltage waveform.
 3. The model of claim 1, wherein the standard cell being modeled by the model is a multi-channel-connected component (multi-CCC) standard cell.
 4. The model of claim 1, wherein the standard cell being modeled by the model is a single-channel-connected component (single-CCC) standard cell, and the voltage waveform transfer function is a constant such that the intermediate voltage waveform is substantially similar to the input voltage waveform.
 5. The model of claim 4, wherein the constant for the voltage waveform transfer function is one.
 6. A model for standard cells to perform static timing analysis and sensitivity analysis of an integrated circuit design under process variations, wherein the model is stored as software in a storage device for execution with a computer, the model comprising: a voltage waveform transfer function to receive an input voltage waveform and transform it into an intermediate voltage waveform in response to a standard cell being modeled; a voltage dependent current source to generate an output current in response to the intermediate voltage waveform; an output capacitor coupled in parallel to the voltage dependent current source; and a miller capacitor coupled between the voltage waveform transfer function and the voltage dependent current source, the miller capacitor having a miller capacitance to provide feedback to the voltage waveform transfer function to generate the intermediate voltage waveform in response to the input voltage waveform and the output voltage across the voltage dependent current source.
 7. The model of claim 6, wherein a capacitance of the output capacitor is responsive to an output voltage across the voltage dependent current source and the intermediate voltage waveform.
 8. The model of claim 6, wherein the standard cell being modeled by the model is a multi-channel-connected component (multi-CCC) standard cell.
 9. The model of claim 6, wherein the standard cell being modeled by the model is a single-channel-connected component (single-CCC) standard cell, and the voltage waveform transfer function is a constant such that the intermediate voltage waveform is substantially similar to the input voltage waveform.
 10. The model of claim 9, wherein the constant for the voltage waveform transfer function is one. 